In this paper we estend the class of MAP queueing networks to include blocking models. We consider two different blocking mechanisms: Repetitive Service-Random Destination and Blocking After Service. We analyze the Markov process underlying the MAP queueing network and propose a methodology based on a partition of the state space into “marginal state spaces”. By using this partition, we prove a set of “partial” balance equations that relates blocking performance indexes. The proposed methodology can be a sound framework to define approximate solution methods for MAP queueing networks with blocking.
DE NITTO PERSONE', V., Smirni, E., Casale, G. (2010). Analysis of blocking networks with temporal dependence.
Analysis of blocking networks with temporal dependence
DE NITTO PERSONE', VITTORIA;
2010-03-26
Abstract
In this paper we estend the class of MAP queueing networks to include blocking models. We consider two different blocking mechanisms: Repetitive Service-Random Destination and Blocking After Service. We analyze the Markov process underlying the MAP queueing network and propose a methodology based on a partition of the state space into “marginal state spaces”. By using this partition, we prove a set of “partial” balance equations that relates blocking performance indexes. The proposed methodology can be a sound framework to define approximate solution methods for MAP queueing networks with blocking.| File | Dimensione | Formato | |
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